题目内容
13.已知直线x+y-1=0和直线x-2y-4=0的交点为P.(1)求过点P且与直线x-2y+1=0垂直的直线方程;
(2)若点Q在圆(x+1)2+y2=4上运动,求线段PQ的中点M的轨迹方程.
分析 (1)求出P的坐标,求出直线斜率,从而求出直线方程即可;
(2)设M(x,y),Q(x0,y0),表示出Q的坐标,得到${{(x}_{0}+1)}^{2}$+${{y}_{0}}^{2}$=4,代入可得(2x-2+1)2+(2y+1)2=4,求出M的轨迹方程即可.
解答 解:(1)联立方程组$\left\{\begin{array}{l}{x+y-1=0}\\{x-2y-4=0}\end{array}\right.$,
解得:$\left\{\begin{array}{l}{x=2}\\{y=-1}\end{array}\right.$,故P(2,-1),
又所求直线与直线x-2y+1=0垂直,
故所求直线的斜率是-2,
故所求直线的方程是y+1=-2(x-2),
即2x+y-3=0;
(2)设M(x,y),Q(x0,y0),
则$\left\{\begin{array}{l}{x=\frac{{x}_{0}+2}{2}}\\{y=\frac{{y}_{0}-1}{2}}\end{array}\right.$,故$\left\{\begin{array}{l}{{x}_{0}=2x-2}\\{{y}_{0}=2y+1}\end{array}\right.$,
又∵Q是圆(x+1)2+y2=4上的动点,
∴${{(x}_{0}+1)}^{2}$+${{y}_{0}}^{2}$=4,
代入可得(2x-2+1)2+(2y+1)2=4,
化简得${(x-\frac{1}{2})}^{2}{+(y+\frac{1}{2})}^{2}=1$,
故M的轨迹方程是${(x-\frac{1}{2})}^{2}{+(y+\frac{1}{2})}^{2}=1$.
点评 本题考查了直线的垂直关系,考查轨迹方程问题,是一道中档题.
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